Solve the problem.A steel can in the shape of a right circular cylinder must be designed to hold 650 cubic centimeters of juice (see figure). It can be shown that the total surface area of the can (including the ends) is given by S(r) = 2?r2 + , where r is the radius of the can in centimeters. Using the TABLE feature of a graphing utility, find the radius that minimizes the surface area (and thus the cost) of the can. Round to the nearest tenth of a centimeter. 

Translate the following into an inequality statement.x is greater than -6 and at most 9.

A. -6 ? x < 9 B. -9 < x ? 6 C. 9 ? x < -6 D. -6 < x ? 9

Simplify the expression.-

A.
B. -
C. -
D. -7x⁸

Find the quotient and the remainder.27x8 - 45x4  divided by 9x

A. 3x8 - 5x4; remainder 0 B. 3x9 - 5x5; remainder 0 C. 3x7 - 5x3; remainder 0 D. 27x7 - 45x3; remainder 0

Write the first five terms of the geometric sequence.an = -2an-1; a1 = 3

A. -2, -6, -12, -24, -48 B. 3, 1, -1, -3, -5 C. -6, 12, -24, 48, -96 D. 3, -6, 12, -24, 48